苏州市2018届高三上学期期中考试数学试题.doc

1、苏州市2018届高三第一学期期中调研试卷 数 学 一、填空题(本大题共14小题，每小题5分，共70分，请把答案直接填写在答卷纸相应的位置) 1．已知集合，则 ▲ ． 2．函数的定义域为 ▲ ． 3．设命题；命题，那么p是q的 ▲ 条件（选填“充分不必要”、“必要不充分”、“充要”、“既不充分也不必要”）． 4．已知幂函数在是增函数，则实数m的值是 ▲ ． 5．已知曲线在处的切线的斜率为2，则实数a的值是 ▲ ． 6．已知等比数列中，，，则 ▲ ． 7．函数图象的一条对称轴是，则的值是 ▲ ． 8．已知奇函数在上单调递

2、减，且，则不等式的解集为 ▲ ． 9．已知，则的值是 ▲ ． 10．若函数的值域为，则实数a的取值范围是 ▲ ． 11．已知数列满足，则 ▲ ． 12．设的内角的对边分别是，D为的中点，若且，则面积的最大值是 ▲ ． 13．已知函数，若对任意的实数，都存在唯一的实数，使，则实数的最小值是 ▲ ． 14．已知函数，若直线与交于三个不同的点 （其中），则的取值范围是 ▲ ． 二、解答题(本大题共6个小题，共90分，请在答题卷区域内作答，解答时应写出文字说明、证明过程或演算步骤) 15．(本题满分14分) 已知函数的图象与x轴相

3、切，且图象上相邻两个最高点之间的距离为． （1）求的值； （2）求在上的最大值和最小值． 16．(本题满分14分) 在中，角A,B,C所对的边分别是a,b,c，已知，且． （1）当时，求的值； （2）若角A为锐角，求m的取值范围． 17．(本题满分15分) 已知数列的前n项和是，且满足，． （1）求数列的通项公式； （2）在数列中，，，若不等式对有解，求实数的取值范围． 18．(本题满分15分) 如图所示的自动通风设施．该设施的下部ABCD是等腰梯形，其中为2米，梯形的高为1米，为3米，上部是个半圆，固定点E为CD的中点．MN是由电脑控制可以上下滑动的伸缩

4、横杆（横杆面积可忽略不计），且滑动过程中始终保持和CD平行．当MN位于CD下方和上方时，通风窗的形状均为矩形MNGH（阴影部分均不通风）． （1）设MN与AB之间的距离为且米，试将通风窗的通风面积S（平方米）表示成关于x的函数； （2）当MN与AB之间的距离为多少米时，通风窗的通风面积取得最大值？ 19．(本题满分16分) 已知函数． （1）求过点的的切线方程； （2）当时，求函数在的最大值； （3）证明：当时，不等式对任意均成立（其中为自然对数的底数,）． 20．(本题满分16分) 已知数列各项均为正数，,，且对任意恒成立，记的前n项和为．

5、1）若，求的值； （2）证明：对任意正实数p，成等比数列； （3）是否存在正实数t，使得数列为等比数列．若存在，求出此时和的表达式；若不存在，说明理由． 2017—2018学年第一学期高三期中调研试卷 数学(附加题部分) 21．【选做题】本题包括A、B、C、D四小题，请选定其中两题，并在相应的答题区域内作答．若多做，则按作答的前两题评分．解答时应写出文字说明、证明过程或演算步骤． A．(几何证明选讲)（本小题满分10分） 如图，AB为圆O的直径，C在圆O上，于F，点D为线段CF上任意一点，延长AD交圆O于E，． （1）求证：； （2）若，求的

6、值． B．(矩阵与变换)（本小题满分10分） 已知矩阵，，求的值． C．(极坐标与参数方程)（本小题满分10分） 在平面直角坐标系中，直线的参数方程为(为参数)，以原点为极点，轴正半轴为极轴建立极坐标系，圆的极坐标方程为． （1）求直线和圆的直角坐标方程； （2）若圆C任意一条直径的两个端点到直线l的距离之和为，求a的值． D．(不等式选讲)（本小题满分10分） 设均为正数，且，求证：． 【必做题】第22、23题，每小题10分，共计20分．请在答题卡指定区域内作答，解答时应写出文字说明、证明过程或演算步骤． 22．(本小题满

7、分10分) 在小明的婚礼上，为了活跃气氛，主持人邀请10位客人做一个游戏．第一轮游戏中，主持人将标有数字1,2,…,10的十张相同的卡片放入一个不透明箱子中，让客人依次去摸，摸到数字6,7,…,10的客人留下，其余的淘汰，第二轮放入1,2,…,5五张卡片，让留下的客人依次去摸，摸到数字3,4,5的客人留下，第三轮放入1,2,3三张卡片，让留下的客人依次去摸，摸到数字2,3的客人留下，同样第四轮淘汰一位，最后留下的客人获得小明准备的礼物．已知客人甲参加了该游戏． （1）求甲拿到礼物的概率； （2）设表示甲参加游戏的轮数，求的概率分布和数学期望． 23．(本

8、小题满分10分) （1）若不等式对任意恒成立，求实数a的取值范围； （2）设，试比较与的大小，并证明你的结论． 2017—2018学年第一学期高三期中调研试卷 数 学 参 考 答 案 一、填空题(本大题共14小题，每小题5分，共70分) 1． 2． 3．充分不必要 4．1 5． 6．4 7． 8． 9． 10． 11． 12．

9、 13． 14． 二、解答题(本大题共6个小题，共90分) 15．(本题满分14分) 解：（1）∵图象上相邻两个最高点之间的距离为， ∴的周期为，∴，······································································2分 ∴，··················································································································4分

10、 此时， 又∵的图象与x轴相切，∴，·······················································6分 ∴；··········································································································8分 （2）由（1）可得， ∵，∴， ∴当，即时，有最大值为；·················································11分 当，即时，有最小值为0．··············

11、··········································14分 16．(本题满分14分) 解：由题意得，．···············································································2分 （1）当时，， 解得或；································································································6分 （2），····························8分

12、 ∵A为锐角，∴，∴，····················································11分 又由可得，·························································································13分 ∴．·····································································································14分 17．(本题满分15分) 解：（1）∵，∴，

13、∴，·························································································2分 又当时，由得符合，∴，······························3分 ∴数列是以1为首项，3为公比的等比数列，通项公式为；·····················5分 （2）∵，∴是以3为首项，3为公差的等差数列，····················7分 ∴，····························································

14、·························9分 ∴，即，即对有解，··································10分 设， ∵， ∴当时，，当时，， ∴， ∴，···························································································14分 ∴．····································································································

15、·········15分 18．(本题满分15分) 解：（1）当时，过作于（如上图）， 则，，， 由，得， ∴， ∴；·······························································4分 当时，过作于，连结（如下图）， 则，， ∴， ∴，······································································8分 综上：；······························································

16、···9分 （2）当时，在上递减， ∴；································································································11分 当时，， 当且仅当，即时取“”， ∴，此时，∴的最大值为，············································14分 答：当MN与AB之间的距离为米时，通风窗的通风面积取得最大值．····················15分 19．(本题满分16分) 解：（1）设切点坐标为，则切线方程为， 将代入上式

17、得，， ∴切线方程为；·······························································································2分 （2）当时，， ∴，············································································3分 当时，，当时，， ∴在递增，在递减，·············································································5

18、分 ∴当时，的最大值为； 当时，的最大值为；········································································7分 （3）可化为， 设，要证时对任意均成立， 只要证，下证此结论成立． ∵，∴当时，，·······················································8分 设，则，∴在递增， 又∵在区间上的图象是一条不间断的曲线，且，， ∴使得，即，，····················································11分

19、 当时，，；当时，，； ∴函数在递增，在递减， ∴，····························14分 ∵在递增，∴，即， ∴当时，不等式对任意均成立．··························16分 20．(本题满分16分) 解：（1）∵，∴，又∵，∴；·······································2分 （2）由，两式相乘得， ∵，∴， 从而的奇数项和偶数项均构成等比数列，···································································4分 设公比

20、分别为，则，，······································5分 又∵，∴，即，···························································6分 设，则，且恒成立， 数列是首项为，公比为的等比数列，问题得证；····································8分 （3）法一：在（2）中令，则数列是首项为，公比为的等比数列， ∴， ，·····································································10分

21、 且， ∵数列为等比数列，∴ 即，即 解得（舍去），·························································································13分 ∴，， 从而对任意有， 此时，为常数，满足成等比数列， 当时，，又，∴， 综上，存在使数列为等比数列，此时．······················16分 法二：由（2）知，则，，且， ∵数列为等比数列，∴ 即，即 解得（舍去），···················································

22、····································11分 ∴，，从而对任意有，····································13分 ∴， 此时，为常数，满足成等比数列， 综上，存在使数列为等比数列，此时．······················16分 21．【选做题】本题包括A、B、C、D四小题，请选定其中两题，并在相应的答题区域内作答．若多做，则按作答的前两题评分．解答时应写出文字说明、证明过程或演算步骤． A．(几何证明选讲，本小题满分10分) 解：（1）证明 ：连接，∵，∴， 又，∴为等边三角形， ∵，∴为中边上的中线

23、 ∴；······································································5分 （2）解：连接BE， ∵，是等边三角形， ∴可求得，， ∵为圆O的直径，∴，∴， 又∵，∴∽，∴， 即．··················································································10分 B．(矩阵与变换，本小题满分10分) 解：矩阵A的特征多项式为， 令，解得矩阵A的特征值，······························

24、······························2分 当时特征向量为，当时特征向量为，·····································6分 又∵，······························································································8分 ∴．···········································································10分 C．(极坐标与参数方程，本小题满分10分) 解：（

25、1）直线的普通方程为；··········································································3分 圆C的直角坐标方程为；·······························································6分 （2）∵圆C任意一条直径的两个端点到直线l的距离之和为， ∴圆心C到直线l的距离为，即，·······················································8分 解得或．·························

26、······································································10分 D．(不等式选讲，本小题满分10分) 证：∵， ∴ ， ∴．····················································································10分 22．(本题满分10分) 解：（1）甲拿到礼物的事件为， 在每一轮游戏中，甲留下的概率和他摸卡片的顺序无关， 则， 答：甲拿到礼物的概率为；····························

27、···························································3分 （2）随机变量的所有可能取值是1,2,3,4．·····································································4分 ， ， ， ， 随机变量的概率分布列为： 1 2 3 ·············································8分 4 P 所以．······································

28、······························10分 23．(本题满分10分) 解：（1）原问题等价于对任意恒成立， 令，则， 当时，恒成立，即在上单调递增， ∴恒成立； 当时，令，则， ∴在上单调递减，在上单调递增， ∴，即存在使得，不合题意； 综上所述，a的取值范围是．················································································4分 （2）法一：在（1）中取，得， 令，上式即为， 即，···································

29、··························································7分 ∴ 上述各式相加可得．····················································10分 法二：注意到，，……， 故猜想，····································································5分 下面用数学归纳法证明该猜想成立． 证明：①当时，，成立；·············································································6分 ②假设当时结论成立，即， 在（1）中取，得， 令，有，·······································································8分 那么，当时， ，也成立； 由①②可知，．·····································································10分 高三数学 期中试卷 第 14 页 共 14 页